Open Access
August 2010 Convergence of complex multiplicative cascades
Julien Barral, Xiong Jin, Benoît Mandelbrot
Ann. Appl. Probab. 20(4): 1219-1252 (August 2010). DOI: 10.1214/09-AAP665

Abstract

The familiar cascade measures are sequences of random positive measures obtained on [0, 1] via b-adic independent cascades. To generalize them, this paper allows the random weights invoked in the cascades to take real or complex values. This yields sequences of random functions whose possible strong or weak limits are natural candidates for modeling multifractal phenomena. Their asymptotic behavior is investigated, yielding a sufficient condition for almost sure uniform convergence to nontrivial statistically self-similar limits. Is the limit function a monofractal function in multifractal time? General sufficient conditions are given under which such is the case, as well as examples for which no natural time change can be used. In most cases when the sufficient condition for convergence does not hold, we show that either the limit is 0 or the sequence diverges almost surely. In the later case, a functional central limit theorem holds, under some conditions. It provides a natural normalization making the sequence converge in law to a standard Brownian motion in multifractal time.

Citation

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Julien Barral. Xiong Jin. Benoît Mandelbrot. "Convergence of complex multiplicative cascades." Ann. Appl. Probab. 20 (4) 1219 - 1252, August 2010. https://doi.org/10.1214/09-AAP665

Information

Published: August 2010
First available in Project Euclid: 20 July 2010

zbMATH: 1221.60028
MathSciNet: MR2676938
Digital Object Identifier: 10.1214/09-AAP665

Subjects:
Primary: 60F05 , 60F15 , 60F17 , 60G18 , 60G42 , 60G44
Secondary: 28A78

Keywords: continuous function-valued martingales , functional central limit theorem , Laws stable under random weighted mean , Multifractals , multiplicative cascades

Rights: Copyright © 2010 Institute of Mathematical Statistics

Vol.20 • No. 4 • August 2010
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